What are geometric arrangements?
"Geometric arrangements" is a term to describe the arrangement of anything in a common geometric shape.
In this web package, we will learn about how numbers are arranged in geometric shapes such as triangles. Some of these arrangements are the Pascal's Triangle and Leibniz harmonic triangle. Today, we will be elaborating on these two arrangements.
What are these arrangements used for?
These arrangements of numbers have many uses. These are such as calculating probability. For example, a pascal's triangle can help you to quickly deduce how many ways you can find your way to a certain place provided you can figure out a system in which to get to your place, you have to jump on multiple checkerboard square units. For example, a street can be one checkerboard while a section of a road can be another. We will touch on this later in other pages.
Finding your way around this page...
To navigate your way around this page, click on the various pages on the sidebar on the right. This is the main page. On subpages, you can find information under the subpage's topic. This web package is designed to be as comprehensive as possible without other medium, however, the user can opt to search on the net for other media if he wants to enrich his learning experience.
Welcome to this Web Resource on:
Geometric Arrangements of Numbers
Two Forms of Triangles
What are geometric arrangements?
"Geometric arrangements" is a term to describe the arrangement of anything in a common geometric shape.
In this web package, we will learn about how numbers are arranged in geometric shapes such as triangles. Some of these arrangements are the Pascal's Triangle and Leibniz harmonic triangle. Today, we will be elaborating on these two arrangements.
What are these arrangements used for?
These arrangements of numbers have many uses. These are such as calculating probability. For example, a pascal's triangle can help you to quickly deduce how many ways you can find your way to a certain place provided you can figure out a system in which to get to your place, you have to jump on multiple checkerboard square units. For example, a street can be one checkerboard while a section of a road can be another. We will touch on this later in other pages.
Finding your way around this page...
To navigate your way around this page, click on the various pages on the sidebar on the right. This is the main page. On subpages, you can find information under the subpage's topic. This web package is designed to be as comprehensive as possible without other medium, however, the user can opt to search on the net for other media if he wants to enrich his learning experience.